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Michael Elad The Computer Science Department The Technion – Israel Institute of technology

Sparse & Redundant Representations and Their Use in Signal and Image Processing CS Course 236862 – Winter 2012. Michael Elad The Computer Science Department The Technion – Israel Institute of technology Haifa 32000, Israel October 28, 2012. What This Field is all About ?.

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Michael Elad The Computer Science Department The Technion – Israel Institute of technology

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  1. Sparse & Redundant Representations and Their Use in Signal and Image Processing CS Course 236862 – Winter 2012 Michael Elad The Computer Science Department The Technion – Israel Institute of technology Haifa 32000, Israel October 28, 2012

  2. What This Field is all About ? • Depends whom you ask, as the researchers in this field come from the following disciplines: • Mathematics • Applied Mathematics • Statistics • Signal & Image Processing: CS, EE, Bio-medical, … • Computer-Science Theory • Machine-Learning • Physics (optics) • Geo-Physics • Astronomy • Psychology (neuroscience) • … Michael Elad The Computer-Science Department The Technion

  3. My Answer (For Now) A New Transform for Signals • We are all well-aware of the idea of transforming a signal and changing its representation. • We apply a transform to gain something – efficiency, simplicity of the subsequent processing, speed, … • There is a new transform in town, based on sparse and redundant representations. Michael Elad The Computer-Science Department The Technion

  4. n Transforms – The General Picture Invertible Transforms n n Linear Separable Structured Unitary Michael Elad The Computer-Science Department The Technion

  5. m Redundancy? • In a redundant transform, the representation vector is longer (m>n). • This can still be done while preserving the linearity of the transform: n n n m Michael Elad The Computer-Science Department The Technion

  6. m Sparse & Redundant Representation • We shall keep the linearity of the inverse-transform. • As for the forward (computing  from x), there are infinitely many possible solutions. • We shall seek the sparsest of all solutions – the one with the fewest non-zeros. • This makes the forward transform a highly non-linear operation. • The field of sparse and redundant representations is all about defining clearly this transform, solving various theoretical and numerical issues related to it, and showing how to use it in practice. n n Sounds … Boring !!!! Who cares about a new transform? Michael Elad The Computer-Science Department The Technion

  7. Stock Market Heart Signal CT Radar Imaging Still Image Voice Signal Traffic Information Lets Take a Wider Perspective • We are surrounded by various sources of massive information of different nature. • All these sources have some internal structure, which can be exploited. Michael Elad The Computer-Science Department The Technion

  8. Model? Effective removal of noise (and many other applications) relies on an proper modeling of the signal Michael Elad The Computer-Science Department The Technion

  9. Reliability Simplicity Which Model to Choose? • There are many different ways to mathematically model signals and images with varying degrees of success. • The following is a partial list of such models (for images): • Good models should be simple while matching the signals: Principal-Component-Analysis Anisotropic diffusion Markov Random Field Wienner Filtering DCT and JPEG Wavelet & JPEG-2000 Piece-Wise-Smooth C2-smoothness Besov-Spaces Total-Variation Beltrami-Flow Michael Elad The Computer-Science Department The Technion

  10. 24KB 178KB – Raw data 20KB 12KB 8KB Discrete Cosine Trans. 4KB The model assumption: after DCT, the top left coefficients to be dominant and the rest zeros. An Example: JPEG and DCT How & why does it works? Michael Elad The Computer-Science Department The Technion

  11. Research in Signal/Image Processing Problem (Application) Model Signal Numerical Scheme A New Research Work (and Paper) is Born The fields of signal & image processing are essentially built of an evolution of models and ways to use them for various tasks Michael Elad The Computer-Science Department The Technion

  12. Again: What This Field is all About? A Data Model and Its Use • Almost any task in data processing requires a model – true for denoising, deblurring, super-resolution, inpainting, compression, anomaly-detection, sampling, and more. • There is a new model in town – sparse and redundant representation – we will call it Sparseland. • We will be interested in a flexible model that can adjust to the signal. Michael Elad The Computer-Science Department The Technion

  13. Signal Transforms Wavelet Theory Approximation Theory Multi-Scale Analysis Linear Algebra Optimization Theory Machine Learning Inpainting Compression Blind Source Separation Super-Resolution Demosaicing Denoising A New Emerging Model Mathematics Signal Processing Sparseland and Example-Based Models Michael Elad The Computer-Science Department The Technion

  14. Σ α1 α3 α2 The SparselandModel • Task: model image patches of size 10×10 pixels. • We assume that a dictionary of such image patches is given, containing 256 atom images. • The Sparseland model assumption: every image patch can be described as a linear combination of few atoms. Michael Elad The Computer-Science Department The Technion

  15. Σ α1 α3 α2 The SparselandModel Properties of this model: Sparsity and Redundancy. Chemistry of Data • We start with a 10-by-10 pixels patch and represent it using 256 numbers – This is a redundant representation. • However, out of those 256 elements in the representation, only 3 are non-zeros – This is a sparse representation. • Bottom line in this case: 100 numbers representing the patch are replaced by 6 (3 for the indices of the non-zeros, and 3 for their entries). Michael Elad The Computer-Science Department The Technion

  16. m Model vs. Transform ? • The relation between the signal x and its representation  is the following linear system, just as described earlier. • We shall be interested in seeking sparse solutions to this system when deploying the sparse and redundant representation model. • This is EXACTLY the transform we discussed earlier. n n Bottom Line: The transform and the model we described above are the same thing, and their impact on signal/image processing is profound and worth studying. Michael Elad The Computer-Science Department The Technion

  17. Σ α1 α3 α2 Difficulties With Sparseland • Problem 1: Given an image patch, how can we find its atom decomposition ? • A simple example: • There are 2000 atoms in the dictionary • The signal is known to be built of 15 atoms • possibilities • If each of these takes 1nano-sec to test, this will take ~7.5e20 years to finish !!!!!! • Solution: Approximation algorithms Michael Elad The Computer-Science Department The Technion

  18. Σ α1 α3 α2 Difficulties With Sparseland • Various algorithms exist. Their theoretical analysis guarantees their success if the solution is sparse enough • Here is an example – the Iterative Reweighted LS: Michael Elad The Computer-Science Department The Technion

  19. Σ α1 α3 α2 Difficulties With Sparseland • Problem 2: Given a family of signals, how do we find the dictionary to represent it well? • Solution: Learn! Gather a large set of signals (many thousands), and find the dictionary that sparsifies them. • Such algorithms were developed in the past 5 years (e.g., K-SVD), and their performance is surprisingly good. • This is only the beginning of a new era in signal processing … Michael Elad The Computer-Science Department The Technion

  20. Σ α1 α3 α2 Difficulties With Sparseland • Problem 3: Is this model flexible enough to describe various sources? e.g., Is it good for images? Audio? Stocks? … • General answer: Yes, this model is extremely effective in representing various sources. • Theoretical answer: yet to be given. • Empirical answer: we will see in this course, several image processing applications, where this model leads to the best known results (benchmark tests). Michael Elad The Computer-Science Department The Technion

  21. Σ α1 α3 α2 Difficulties With Sparseland? • Problem 1: Given an image patch, how can we find its atom decomposition? • Problem 2: Given a family of signals, how do we find the dictionary to represent it well? • Problem 3: Is this model flexible enough to describe various sources? E.g., Is it good for images? audio? … ALL ANSWERED POSITIVELY AND CONSTRUCTIVELY Michael Elad The Computer-Science Department The Technion

  22. This Course Will review a decade of tremendous progress in the field of Sparse and Redundant Representations Numerical Problems Applications (image processing) Theory Michael Elad The Computer-Science Department The Technion

  23. Who is Working on This? Donoho, Candes – Stanford Tropp – CalTech Baraniuk, W. Yin – RiceTexas Gilbert, Strauss – U-Michigan Gribonval, Fuchs – INRIAFrance Starck – CEA – France Vandergheynst, Cehver– EPFLSwiss Rao, Delgado – UC San-Diego Do, Ma – U-Illinois Tanner, Davies – Edinbourgh UK Elad, Zibulevsky, Bruckstein, Eldar – Technion Goyal – MIT Mallat – Ecole-Polytec. Paris Daubechies – Princeton Coifman – Yale Romberg – GaTech Lustig, Wainwright – Berkeley Sapiro – UMN Friedlander – UBCCanada Tarokh – Harvard Cohen, Combettes – Paris VI Michael Elad The Computer-Science Department The Technion

  24. This Field is rapidly Growing … • Searching ISI-Web-of-Science: • Topic=((spars* and (represent* or approx* or solution) • and (dictionary or pursuit)) or • (compres* and sens* and spars*)) • led to 1368 papers • Here is how they spread over time: Michael Elad The Computer-Science Department The Technion

  25. Which Countries? Michael Elad The Computer-Science Department The Technion

  26. Who is Publishing in This Area? Michael Elad The Computer-Science Department The Technion

  27. Here Are Few Examples for the Things That We Did With This Model So Far … Michael Elad The Computer-Science Department The Technion

  28. Image Separation [Starck, Elad, & Donoho(`04)] The Cartoon part spanned by wavelets The original image - Galaxy SBS 0335-052 as photographed by Gemini The texture part spanned by global DCT The residual being additive noise Michael Elad The Computer-Science Department The Technion

  29. Outcome Source Inpainting[Starck, Elad, and Donoho(‘05)] Michael Elad The Computer-Science Department The Technion

  30. Source Result 30.829dB Noisy image The obtained dictionary after 10 iterations Initial dictionary (overcomplete DCT) 64×256 Image Denoising (Gray) [Elad & Aharon (`06)] Michael Elad The Computer-Science Department The Technion

  31. Original Noisy (12.77dB) Result (29.87dB) Denoising (Color) [Mairal, Elad & Sapiro, (‘06)] Original Noisy (20.43dB) Result (30.75dB) Michael Elad The Computer-Science Department The Technion

  32. Deblurring[Elad, Zibulevsky and Matalon, (‘07)] original (left), Measured (middle), and Restored (right): Iteration: 0 ISNR=-16.7728 dB original (left), Measured (middle), and Restored (right): Iteration: 1 ISNR=0.069583 dB original (left), Measured (middle), and Restored (right): Iteration: 2 ISNR=2.46924 dB original (left), Measured (middle), and Restored (right): Iteration: 3 ISNR=4.1824 dB original (left), Measured (middle), and Restored (right): Iteration: 4 ISNR=4.9726 dB original (left), Measured (middle), and Restored (right): Iteration: 5 ISNR=5.5875 dB original (left), Measured (middle), and Restored (right): Iteration: 6 ISNR=6.2188 dB original (left), Measured (middle), and Restored (right): Iteration: 7 ISNR=6.6479 dB original (left), Measured (middle), and Restored (right): Iteration: 8 ISNR=6.6789 dB original (left), Measured (middle), and Restored (right): Iteration: 12 ISNR=6.9416 dB original (left), Measured (middle), and Restored (right): Iteration: 19 ISNR=7.0322 dB Michael Elad The Computer-Science Department The Technion

  33. Inpainting (Again!) [Mairal, Elad & Sapiro, (‘06)] Original 80% missing Original 80% missing Result Result Michael Elad The Computer-Science Department The Technion

  34. Video Denoising [Protter & Elad (‘06)] Original Noisy (σ=25) Denoised Original Noisy (σ=50) Denoised Michael Elad The Computer-Science Department The Technion

  35. 15.81 13.89 6.60 14.67 12.41 5.49 15.30 12.57 6.36 Facial Image Compression [Brytt and Elad (`07)] Results for 550 Bytes per each file Michael Elad The Computer-Science Department The Technion

  36. ? 18.62 7.61 ? 16.12 6.31 ? 16.81 7.20 Facial Image Compression [Brytt and Elad (`07)] Results for 400 Bytes per each file Michael Elad The Computer-Science Department The Technion

  37. Super-Resolution [Zeyde, Protter& Elad (‘09)] Ideal Image SR Result PSNR=16.95dB Bicubic interpolation PSNR=14.68dB Given Image Michael Elad The Computer-Science Department The Technion

  38. Super-Resolution [Zeyde, Protter& Elad (‘09)] The Original Bicubic Interpolation SR result Michael Elad The Computer-Science Department The Technion

  39. Which model to choose? Are they working well? To Summarize An effective (yet simple) model for signals/images is key in getting better algorithms for various applications Sparse and redundant representations and other example-based modeling methods are drawing a considerable attention in recent years Yes, these methods have been deployed to a series of applications, leading to state-of-the-art results. In parallel, theoretical results provide the backbone for these algorithms’ stability and good-performance Michael Elad The Computer-Science Department The Technion

  40. And now some Administrative issues … Michael Elad The Computer-Science Department The Technion

  41. This Course – General ייצוגים דלילים ויתירים ושימושיהם בעיבוד אותות ותמונות מספר הקורס: 236862 Michael Elad The Computer-Science Department The Technion

  42. Course Material • We shall follow this book. • No need to buy the book. The lectures will be self-contained. • The material we will cover has appeared in 40-60 research papers that were published mostly (not all) in the past 6-7 years. Michael Elad The Computer-Science Department The Technion

  43. This Course Site http://www.cs.technion.ac.il/~elad/teaching/courses/Sparse_Representations_Winter_2012/index.htm Go to my home page, click the “teaching” tab, then “courses”, and choose the top on the list Michael Elad The Computer-Science Department The Technion

  44. This Course – Lectures and HW Michael Elad The Computer-Science Department The Technion

  45. This Course - Grades • דרישות הקורס • זהו קורס בפורמט רגיל (כל ההרצאות תינתנה ע"י המרצה האחראי). • במהלך הקורס יינתנו 4 תרגילי בית (הגשה בזוגות) עם דגש על תכנות ב-MATLAB. • כל צמד סטודנטים יבצעו פרויקט המבוסס על 1-3 מאמרים מהעת האחרונה. בפרויקט יידרשו הסטודנטים להכין מצגתודו"ח מסכם ובו תיאור של המאמרים הללו, תרומתם, והשאלות הפתוחות שהותירו (היקף של כ-20-30 עמודים). • בסיום הקורס יאורגן יום עיון ובו משתתפי הקורס יציגו את הפרויקטים. • בסיום הקורס תיערך בחינה בת 20-30 שאלות אשר תבדוק התמצאות כללית בחומר . • מבנה הציון • 30% - תרגילי בית, 20% - סמינר על הפרויקט, 20% - דו"ח על הפרויקט, 30% - בחינת התמצאות. • למעוניינים • שומעים חופשיים המעוניינים להצטרף יתקבלו בברכה. • אנא שילחו אימייל ל- elad@cs.technion.ac.ilעל מנת להיכנס לרשימת התפוצה. Michael Elad The Computer-Science Department The Technion

  46. This Course - Projects Read the instruction in the course’s site Michael Elad The Computer-Science Department The Technion

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